Suppose I have an array of integers:

```
int[] A = { 10, 3, 6, 8, 9, 4, 3 };
```

My goal is to find the largest difference between A[Q] and A[P] such that Q > P.

For example, if P = 2 and Q = 3, then

```
diff = A[Q] - A[P]
diff = 8 - 6
diff = 2
```

If P = 1 and Q = 4

```
diff = A[Q] - A[P]
diff = 9 - 3
diff = 6
```

Since 6 is the largest number between all the difference, that is the answer.

My solution is as follows (in C#) but it is inefficient.

```
public int solution(int[] A) {
int N = A.Length;
if (N < 1) return 0;
int difference;
int largest = 0;
for (int p = 0; p < N; p++)
{
for (int q = p + 1; q < N; q++)
{
difference = A[q] - A[p];
if (difference > largest)
{
largest = difference;
}
}
}
return largest;
}
```

How can I improve this so it will run at O(N)? Thanks!

Simply getting the max and min wont work. Minuend (Q) should come after the Subtrahend (P).

This question is based on the "Max-profit" problem in codility (http://codility.com/train/). My solution only scored 66%. It requires O(N) for a score of 100%.

`A[Q] - A[P] with Q > P`

) 6 is indeed the correct answer. 7 would only be possible with`Q = 0`

but that would violate`Q > P`

. – Daniel Hilgarth Sep 23 '13 at 10:19